Conformal restriction: the chordal case

Abstract

We characterize and describe all random subsets K of a given simply connected planar domain (the upper half-plane , say) which satisfy the ``conformal restriction'' property, i.e., K connects two fixed boundary points (0 and ∞, say) and the law of K conditioned to remain in a simply connected open subset D of is identical to that of (K), where is a conformal map from onto D with (0)=0 and (∞)=∞. The construction of this family relies on the stochastic Loewner evolution (SLE) processes with parameter 8/3 and on their distortion under conformal maps. We show in particular that SLE(8/3) is the only random simple curve satisfying conformal restriction and relate it to the outer boundaries of planar Brownian motion and SLE(6).

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